Difference between revisions of "ApCoCoA-1:Knot group"
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=== <div id="Figure Eight Group">[[:ApCoCoA:Symbolic data#Knot groups|Figure Eight Group]]</div> === | === <div id="Figure Eight Group">[[:ApCoCoA:Symbolic data#Knot groups|Figure Eight Group]]</div> === | ||
==== Description ==== | ==== Description ==== | ||
| − | Knots are in mathematic embedding of the circleline in a three-dimensional sphere. | + | Knots are in mathematic embedding of the circleline in a three-dimensional sphere. And the figure eight knot is a specific knot with crossingnumber four. And has the following presentation: |
feg(x,y)= < x,y | yxy^{-1}xy=xyx^{-1}yx > | feg(x,y)= < x,y | yxy^{-1}xy=xyx^{-1}yx > | ||
Latest revision as of 18:33, 8 July 2014
Description
Knots are in mathematic embedding of the circleline in a three-dimensional sphere. And the figure eight knot is a specific knot with crossingnumber four. And has the following presentation:
feg(x,y)= < x,y | yxy^{-1}xy=xyx^{-1}yx >
Reference
Michael Eisermann, Knotengruppen-Darstellungen und Invarianten von endlichem Typ, Rheinischen Friedrich-Wilhelms-Universität, Bonn, 2000
Computation
/*Use the ApCoCoA package ncpoly.*/
Use ZZ/(2)[a,b,c,d];
NC.SetOrdering("LLEX");
Define CreateRelationsAchterknoten()
Relations:=[];
//add the inverse relations
Append(Relations,[[a,c],[1]]);
Append(Relations,[[c,a],[1]]);
Append(Relations,[[b,d],[1]]);
Append(Relations,[[d,b],[1]]);
// add the relation a^(-1)bab^(-1)ab = ba^(-1)ba
Append(Relations,[[c,b,a,d,a,b],[b,c,b,a]]);
Return Relations;
EndDefine;
Relations:=CreateRelationsAchterknoten();
Relations;
Gb:=NC.GB(Relations,31,1,100,1000);
Gb;
Examples in Symbolic Data Format
<FREEALGEBRA createdAt="2014-07-03" createdBy="strohmeier"> <vars>a,b,c,d</vars> <uptoDeg>12</uptoDeg> <basis> <ncpoly>a*c-1</ncpoly> <ncpoly>c*a-1</ncpoly> <ncpoly>b*d-1</ncpoly> <ncpoly>d*b-1</ncpoly> <ncpoly>c*b*a*d*a*b-b*c*b*a</ncpoly> </basis> <Comment>The partial LLex Gb has 316 elements</Comment> <Comment>Achterknotengruppe</Comment> </FREEALGEBRA>
